On nonconvex constellations among primes II: (458,3240)

Abstract

Extending our work on the k-tuple conjecture, we previously applied those methods to the Engelsma counterexamples (narrow constellations) of length J=459 and span |s|=3242. Here we extend that analysis to the 116 Engelsma counterexamples of length J=458 and |s|=3240. We track the evolution of these 116 counterexamples from inadmissible driving terms starting in the cycle of gaps G(11\#) up through their first appearance in G(113\#). We continue developing primorial coordinates for each admissible instance through a breadth-first exhaustive search through G(211\#). Each of the (458,3240) constellations sits inside a (459,3242) constellation, which we call its parent. We show that no (458,3240) constellation occurs outside of its parent until the cycle G(227\#). The early evolution of the (458,3240) constellations is dominated by the evolution of their parents, which we have previously studied. For each (458,3240)-counterexample we calculate its asymptotic relative population, among other constellations of length J=458.